Which Is True About The Completely Simplified Difference Of The Polynomials 6 X 6 − X 3 Y 4 − 5 X Y 5 6x^6 - X^3y^4 - 5xy^5 6 X 6 − X 3 Y 4 − 5 X Y 5 And 4 X 5 Y + 2 X 3 Y 4 + 5 X Y 5 4x^5y + 2x^3y^4 + 5xy^5 4 X 5 Y + 2 X 3 Y 4 + 5 X Y 5 ?A. The Difference Has 3 Terms And A Degree Of 6.B. The Difference Has 4 Terms And A Degree Of 6.C. The

Mar 10, 2025 by ADMIN 342 views

**Simplifying Polynomial Differences: A Step-by-Step Guide**

Understanding Polynomial Differences

When dealing with polynomials, it's essential to understand the concept of differences. The difference between two polynomials is a new polynomial that results from subtracting one polynomial from another. In this article, we'll explore the simplified difference of two given polynomials and determine the correct answer among the provided options.

The Given Polynomials

We are given two polynomials:

$6x^6 - x^3y^4 - 5xy^5$
$4x^5y + 2x^3y^4 + 5xy^5$

Subtracting the Polynomials

To find the difference between these two polynomials, we'll subtract the second polynomial from the first one.

$6x^6 - x^3y^4 - 5xy^5 - (4x^5y + 2x^3y^4 + 5xy^5)$

Simplifying the Expression

Now, let's simplify the expression by combining like terms.

$6x^6 - x^3y^4 - 5xy^5 - 4x^5y - 2x^3y^4 - 5xy^5$

Combine the like terms:

$6x^6 - 4x^5y - 3x^3y^4 - 10xy^5$

Analyzing the Result

After simplifying the expression, we can see that the resulting polynomial has three terms:

$6x^6$
$-4x^5y$
$-3x^3y^4 - 10xy^5$

Determining the Degree

The degree of a polynomial is the highest power of the variable (in this case, $x$ or $y$ ) in any of the terms. In the simplified polynomial, the highest power of $x$ is 6, and the highest power of $y$ is 5. Therefore, the degree of the polynomial is 6.

Conclusion

Based on our analysis, we can conclude that the difference between the two given polynomials has 3 terms and a degree of 6.

Answer Options

Let's review the answer options:

A. The difference has 3 terms and a degree of 6. B. The difference has 4 terms and a degree of 6. C. The difference has 3 terms and a degree of 5.

Choosing the Correct Answer

Based on our analysis, the correct answer is:

A. The difference has 3 terms and a degree of 6.

This answer matches our conclusion that the difference has 3 terms and a degree of 6.

Final Thoughts

In this article, we explored the concept of polynomial differences and simplified the difference between two given polynomials. We analyzed the resulting polynomial and determined its degree. By following these steps, you can simplify polynomial differences and determine the correct answer among the provided options.

Additional Resources

If you're interested in learning more about polynomials and their differences, here are some additional resources:

By following these resources, you can deepen your understanding of polynomials and their differences.

Conclusion

In conclusion, the difference between the two given polynomials has 3 terms and a degree of 6. By simplifying the expression and analyzing the resulting polynomial, we can determine the correct answer among the provided options.

Understanding Polynomial Differences

In our previous article, we explored the concept of polynomial differences and simplified the difference between two given polynomials. In this article, we'll answer some frequently asked questions about polynomial differences to help you better understand this concept.

Q: What is a polynomial difference?

A: A polynomial difference is a new polynomial that results from subtracting one polynomial from another. It's a way to find the difference between two polynomials.

Q: How do I find the difference between two polynomials?

A: To find the difference between two polynomials, you'll need to subtract the second polynomial from the first one. This involves combining like terms and simplifying the resulting expression.

Q: What is the degree of a polynomial difference?

A: The degree of a polynomial difference is the highest power of the variable (in this case, $x$ or $y$ ) in any of the terms. It's determined by the highest power of the variable in the resulting polynomial.

Q: Can a polynomial difference have a negative degree?

A: No, a polynomial difference cannot have a negative degree. The degree of a polynomial is always a non-negative integer.

Q: How do I determine the number of terms in a polynomial difference?

A: To determine the number of terms in a polynomial difference, you'll need to count the number of terms in the resulting polynomial. This involves identifying the individual terms and counting them.

Q: Can a polynomial difference have a zero degree?

A: Yes, a polynomial difference can have a zero degree. This occurs when the resulting polynomial has no terms, or when the polynomial is a constant.

Q: How do I simplify a polynomial difference?

A: To simplify a polynomial difference, you'll need to combine like terms and eliminate any unnecessary terms. This involves rearranging the terms and combining them using the rules of arithmetic.

Q: Can a polynomial difference be a constant?

A: Yes, a polynomial difference can be a constant. This occurs when the resulting polynomial has no variables, or when the polynomial is a constant.

Q: How do I determine the sign of a polynomial difference?

A: To determine the sign of a polynomial difference, you'll need to examine the signs of the individual terms. If the signs are the same, the resulting polynomial will have the same sign. If the signs are different, the resulting polynomial will have a negative sign.

Q: Can a polynomial difference be a polynomial with a negative exponent?

A: No, a polynomial difference cannot be a polynomial with a negative exponent. The exponents in a polynomial must be non-negative integers.

Q: How do I use polynomial differences in real-world applications?

A: Polynomial differences have many real-world applications, including:

Physics: Polynomial differences are used to model the motion of objects and to describe the behavior of physical systems.
Engineering: Polynomial differences are used to design and analyze electrical circuits, mechanical systems, and other engineering applications.
Computer Science: Polynomial differences are used in computer graphics, game development, and other areas of computer science.

Conclusion

In this article, we've answered some frequently asked questions about polynomial differences to help you better understand this concept. By following these questions and answers, you'll be able to apply polynomial differences to a variety of real-world applications.

Additional Resources

If you're interested in learning more about polynomial differences, here are some additional resources:

By following these resources, you can deepen your understanding of polynomial differences and apply them to a variety of real-world applications.